Comparison between W2 distance and H-1 norm, and localisation of Wasserstein distance

Abstract

It is well known that the quadratic Wasserstein distance W2 (·, ·) is formally equivalent, for infinitesimally small perturbations, to some weighted H-1 homogeneous Sobolev norm. In this article I show that this equivalence can be integrated to get non-asymptotic comparison results between these distances. Then I give an application of these results to prove that the W2 distance exhibits some localisation phenomenon: if μ and are measures on Rn and Rn R+ is some bump function with compact support, then under mild hypotheses, you can bound above the Wasserstein distance between · μ and · by an explicit multiple of W2 (μ, ).